Add to ORKGColor poster with text, charts, and formulas.The purpose of this study was to determine a subset from the set of rational tangles that will form a group.University of Wisconsin--Eau Claire Office of Research and Sponsored Programs
This is an exposition of John H. Conway's tangle trick. We discuss what the trick is, how to perform...
Summary: A tangle is an oriented 1-submanifold of the cylinder whose endpoints lie on the two disks ...
Tangles, as introduced by Robertson and Seymour, were designed as an indirect way of capturing clust...
AbstractIn this paper we give two new combinatorial proofs of the classification of rational tangles...
Color poster with text and formulas.Knot theory is a field of topology that studies the embedding of...
AbstractThis paper gives an elementary and self-contained proof of Conway's Basic Theorem on rationa...
[EN] In this paper we present the construction of a group Hopf algebra on the class of rational tang...
In this paper we present the construction of a group Hopf algebra on the class of rational tangles. ...
Abstract. Every irreducible component issβ Γ0 of semi-simple n-dimensional representations of the mo...
This paper gives an elementary and self-contained proof of Conway’s Basic Theorem on rational tangle...
The aim of this thesis is to describe the Khovanov homology of rational tangles. To this extent we d...
Originally, tangles were invented as an abstract tool in mathematical graph theory to prove the famo...
Topology is a branch of mathematics which may be loosely described as the study of flexible spaces...
In this expositional essay, we introduce some elements of the study of groups by analysing the braid...
We provide a formula for the Dubrovnik polynomial of a rational knot in terms of the entries of the ...
This is an exposition of John H. Conway's tangle trick. We discuss what the trick is, how to perform...
Summary: A tangle is an oriented 1-submanifold of the cylinder whose endpoints lie on the two disks ...
Tangles, as introduced by Robertson and Seymour, were designed as an indirect way of capturing clust...
AbstractIn this paper we give two new combinatorial proofs of the classification of rational tangles...
Color poster with text and formulas.Knot theory is a field of topology that studies the embedding of...
AbstractThis paper gives an elementary and self-contained proof of Conway's Basic Theorem on rationa...
[EN] In this paper we present the construction of a group Hopf algebra on the class of rational tang...
In this paper we present the construction of a group Hopf algebra on the class of rational tangles. ...
Abstract. Every irreducible component issβ Γ0 of semi-simple n-dimensional representations of the mo...
This paper gives an elementary and self-contained proof of Conway’s Basic Theorem on rational tangle...
The aim of this thesis is to describe the Khovanov homology of rational tangles. To this extent we d...
Originally, tangles were invented as an abstract tool in mathematical graph theory to prove the famo...
Topology is a branch of mathematics which may be loosely described as the study of flexible spaces...
In this expositional essay, we introduce some elements of the study of groups by analysing the braid...
We provide a formula for the Dubrovnik polynomial of a rational knot in terms of the entries of the ...
This is an exposition of John H. Conway's tangle trick. We discuss what the trick is, how to perform...
Summary: A tangle is an oriented 1-submanifold of the cylinder whose endpoints lie on the two disks ...
Tangles, as introduced by Robertson and Seymour, were designed as an indirect way of capturing clust...